Steady-state and unstable behavior of a single-mode inhomogeneously broadened laser

Year: 1985

Authors: Abraham N.B., Lugiato L. A., Mandel P., Narducci L. M., Brandy D.K.

Autors Affiliation: Bryn Mawr College, Bryn Mawr, PA;
Istituto Nazionale di Ottica, Firenze, Italy;
Dip. di Fisica, Univ. di Milano, Italy;
Dep. Of Physics and Atmospheric Science, Drexel Univ. Philadelphia Pennsylvania

Abstract: This paper is devoted to the study of the steady-state solutions and their stability for inhomogeneously broadened, unidirectional single-mode ring lasers. For both Lorentzian and Gaussian inhomogeneous-broadening profiles it is found that, for appropriate detuning of the laser cavity, as many as three nontrivial steady-state solutions may appear and provide a formal confirmation of a phenomenon termed mode splitting by Casperson and Yariv in 1970. It is shown through stability arguments that bistability between trivial (zero-intensity) and nontrivial solutions is possible. This bistability appears experimentally accessible. The stability of the stationary solutions, especially in connection with its dependence on the detuning and pump parameters, is analyzed. The instability boundary in the plane of these two control parameters can present a fairly complicated structure with alternate ranges of stability and instability. In correspondence with certain points of the instability boundary, two complex-conjugate pairs of eigenvalues of the characteristic equation become simultaneously unstable. This situation is likely to produce spontaneous oscillations with two coexisting fundamental frequencies.

Journal/Review: JOURNAL OF THE OPTICAL SOCIETY OF AMERICA B-OPTICAL PHYSICS

Volume: 2 (1)      Pages from: 35  to: 46

KeyWords: laser modes; laser stability; ring lasers
DOI: 10.1364/JOSAB.2.000035

Citations: 35
data from “WEB OF SCIENCE” (of Thomson Reuters) are update at: 2024-11-10
References taken from IsiWeb of Knowledge: (subscribers only)

Connecting to view paper tab on IsiWeb: Click here
Connecting to view citations from IsiWeb: Click here